Paschalis Karageorgis, John Stalker
Published 2012-03-19Version 1
We obtain a lower bound for the amplitude of nonzero homoclinic traveling wave solutions of the McKenna--Walter suspension bridge model. As a consequence of our lower bound, all nonzero homoclinic traveling waves become unbounded as their speed of propagation goes to zero (in accordance with numerical observations).
Lower Bound and Space-time Decay Rates of Higher Order Derivatives of Solution for the Compressible Navier-Stokes and Hall-MHD Equations
A consequence of a lower bound of the K-energy
A lower bound on the blow-up rate for the Davey-Stewartson system on the torus
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